01221nam0-22003971i-450-99000823927040332120151217141317.088-503-2100-7000823927FED01000823927(Aleph)000823927FED0100082392720051202d2005----km-y0itay50------baitaITa---a---001yySistemi operativicon esempi per l'uso in JavaAbraham Silberschatz, Peter Baer Galvin, Greg Gagneediz. italiana a cura di Vincenzo PiuriMilanoApogeo©2005xxviii, 714 p.ill.24 cmtit. orig.: Operating system concepts with Java, 6th ed.Sistemi operativi005.4321Silberschatz,Abraham7949Galvin,Peter Baer7950Gagne,Greg67055ITUNINARICAUNIMARCBK990008239270403321005.43-SIL-53934SC1005.43-SIL-5A3935SC1005.43-SIL-5B3936SC113 P 01 1215174FINBCSC1FINBCSistemi operativi473960UNINA05427nam 22006135 450 99646653820331620200705044740.03-540-85420-710.1007/978-3-540-85420-3(CKB)1000000000714644(SSID)ssj0000317762(PQKBManifestationID)11292437(PQKBTitleCode)TC0000317762(PQKBWorkID)10308024(PQKB)10443677(DE-He213)978-3-540-85420-3(MiAaPQ)EBC3064003(PPN)13412605X(EXLCZ)99100000000071464420100301d2009 u| 0engurnn|008mamaatxtccrFoundations of Grothendieck Duality for Diagrams of Schemes[electronic resource] /by Joseph Lipman, Mitsuyasu Hashimoto1st ed. 2009.Berlin, Heidelberg :Springer Berlin Heidelberg :Imprint: Springer,2009.1 online resource (X, 478 p.) Lecture Notes in Mathematics,0075-8434 ;1960Bibliographic Level Mode of Issuance: Monograph3-540-85419-3 Includes bibliographical references and indexes.Joseph Lipman: Notes on Derived Functors and Grothendieck Duality -- Derived and Triangulated Categories -- Derived Functors -- Derived Direct and Inverse Image -- Abstract Grothendieck Duality for Schemes -- Mitsuyasu Hashimoto: Equivariant Twisted Inverses -- Commutativity of Diagrams Constructed from a Monoidal Pair of Pseudofunctors -- Sheaves on Ringed Sites -- Derived Categories and Derived Functors of Sheaves on Ringed Sites -- Sheaves over a Diagram of S-Schemes -- The Left and Right Inductions and the Direct and Inverse Images -- Operations on Sheaves Via the Structure Data -- Quasi-Coherent Sheaves Over a Diagram of Schemes -- Derived Functors of Functors on Sheaves of Modules Over Diagrams of Schemes -- Simplicial Objects -- Descent Theory -- Local Noetherian Property -- Groupoid of Schemes -- Bökstedt—Neeman Resolutions and HyperExt Sheaves -- The Right Adjoint of the Derived Direct Image Functor -- Comparison of Local Ext Sheaves -- The Composition of Two Almost-Pseudofunctors -- The Right Adjoint of the Derived Direct Image Functor of a Morphism of Diagrams -- Commutativity of Twisted Inverse with Restrictions -- Open Immersion Base Change -- The Existence of Compactification and Composition Data for Diagrams of Schemes Over an Ordered Finite Category -- Flat Base Change -- Preservation of Quasi-Coherent Cohomology -- Compatibility with Derived Direct Images -- Compatibility with Derived Right Inductions -- Equivariant Grothendieck's Duality -- Morphisms of Finite Flat Dimension -- Cartesian Finite Morphisms -- Cartesian Regular Embeddings and Cartesian Smooth Morphisms -- Group Schemes Flat of Finite Type -- Compatibility with Derived G-Invariance -- Equivariant Dualizing Complexes and Canonical Modules -- A Generalization of Watanabe's Theorem -- Other Examples of Diagrams of Schemes.The first part written by Joseph Lipman, accessible to mid-level graduate students, is a full exposition of the abstract foundations of Grothendieck duality theory for schemes (twisted inverse image, tor-independent base change,...), in part without noetherian hypotheses, and with some refinements for maps of finite tor-dimension. The ground is prepared by a lengthy treatment of the rich formalism of relations among the derived functors, for unbounded complexes over ringed spaces, of the sheaf functors tensor, hom, direct and inverse image. Included are enhancements, for quasi-compact quasi-separated schemes, of classical results such as the projection and Künneth isomorphisms. In the second part, written independently by Mitsuyasu Hashimoto, the theory is extended to the context of diagrams of schemes. This includes, as a special case, an equivariant theory for schemes with group actions. In particular, after various basic operations on sheaves such as (derived) direct images and inverse images are set up, Grothendieck duality and flat base change for diagrams of schemes are proved. Also, dualizing complexes are studied in this context. As an application to group actions, we generalize Watanabe's theorem on the Gorenstein property of invariant subrings.Lecture Notes in Mathematics,0075-8434 ;1960Algebraic geometryCategory theory (Mathematics)Homological algebraAlgebraic Geometryhttps://scigraph.springernature.com/ontologies/product-market-codes/M11019Category Theory, Homological Algebrahttps://scigraph.springernature.com/ontologies/product-market-codes/M11035Algebraic geometry.Category theory (Mathematics).Homological algebra.Algebraic Geometry.Category Theory, Homological Algebra.516.3514A2018E3014F9918A9918F9914L30mscLipman Josephauthttp://id.loc.gov/vocabulary/relators/aut59702Hashimoto Mitsuyasuauthttp://id.loc.gov/vocabulary/relators/autBOOK996466538203316Foundations of Grothendieck Duality for Diagrams of Schemes2831947UNISA